在分数阶微积分的理论框架下,将分形动力学的机制引入到生物黏弹性本构方程的研究中。
Within the framework of the fractional calculus theory, the mechanism of fractal dynamics is introduced to the constitutive equation research of viscoelastic materials.
在分析分数阶微积分的基础上,提出了一种新型模糊分数阶比例积分微分控制器。
A novel fuzzy fractional order proportional integral derivative (FFPID) controller based on fractional calculus is presented.
利用分数阶微积分理论提出等应变率加载情况下的软土应力—应变关系。关系式显示应力—应变之间呈乘幂函数关系。
On the basis of the fractional calculus operator theory, the stress-strain relation of soft soil under the condition of loading with constant strain rate is proposed.
分数阶微积分与分形,特别是分形函数紧密相连,是研究分形函数的一个有力工具。
Fractional calculus is related to fractal, in particular is closely linked with the fractal function, which is a powerful tool to study the fractal function.
在欧氏测度下 ,应用R L分数阶微积分算子理论给出了上述问题的精确解 。
Under the Euclidean measure, the analytical solutions to the above problem are obtained by employing the Riemann Liouville fractional calculus theory.
实验表明,在SIFT中引入分数阶微积分的应用,能够得到更多的特征关键点,提高图像匹配的正确性。
Compared with the original SIFT, the simulation results show that the proposed algorithm can detect more key points, and improves the accuracy of image matching.
实验表明,在SIFT中引入分数阶微积分的应用,能够得到更多的特征关键点,提高图像匹配的正确性。
Compared with the original SIFT, the simulation results show that the proposed algorithm can detect more key points, and improves the accuracy of image matching.
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